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Padmavally, K.
- A Poincare Problem
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1 Ramanujan Institute of Mathematics, IN
1 Ramanujan Institute of Mathematics, IN
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The Journal of the Indian Mathematical Society, Vol 22, No 4 (1958), Pagination: 181-205Abstract
In this paper a boundary value problem conneoted with the study of neutron flux in a reactor is investigated. Consider an infinite reactor in which the plane segments y = 0, - 1 ≤ x ≤ 1, x = 0, - l ≤ y ≤ l are occupied by control rods (assumed to be of zero thickness).- On a Characterization of Minimally Bicompact Spaces: Corrections and Additions
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1 Ramanujan Institute of Mathematics (Karaikudi), Madras, IN
1 Ramanujan Institute of Mathematics (Karaikudi), Madras, IN
Source
The Journal of the Indian Mathematical Society, Vol 17, No 3 (1953), Pagination: 143-149Abstract
Theorem 1 of [2] states that the condition for every closed set A and any limit point p of A, there exists a subset Z of A not containing p but of which p is the sole complete limit point is necessary and sufficient for the space to be minimally bicompact. The proof ([2] page 2) of the sufficiency of this condition assumes that the closure of the set S under the new topology is A -p where A is its closure under the given topology and p some limit point of S (not belonging to S).- On the Cesaro Summabiltty of a Class of Functions
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1 Ramanujan Institute of Mathematics (Karaikudi), Madras, IN
1 Ramanujan Institute of Mathematics (Karaikudi), Madras, IN
Source
The Journal of the Indian Mathematical Society, Vol 17, No 4 (1953), Pagination: 151-158Abstract
C. T. Rajagopal [4] has proved the following two theorems deducing the second theorem from the first and presenting it as an integral analogue of a theorem of M. S. Macphail [3, Theorem I ].- A Characterization of Minimally Bicompact Spaces
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Authors
Affiliations
1 Ramanujan Institute of Mathematics, Madras, IN
1 Ramanujan Institute of Mathematics, Madras, IN